Vaidya spacetimes, black-bounces, and traversable wormholes

Abstract

We consider a non-static evolving version of the regular "black-bounce"/traversable wormhole geometry recently introduced in JCAP02(2019)042 [arXiv:1812.07114 [gr-qc]]. We first re-write the static metric using Eddington-Finkelstein coordinates, and then allow the mass parameter m to depend on the null time coordinate (a la Vaidya). The spacetime metric is \[ ds2=-(1-2m(w)r2+a2)dw2-( 2 \,dw \,dr) +(r2+a2)(dθ2+2θ \;dφ2). \] Here w=\u,v\ denotes the \outgoing,ingoing\ null time coordinate; representing \retarded,advanced\ time. This spacetime is still simple enough to be tractable, and neatly interpolates between Vaidya spacetime, a black-bounce, and a traversable wormhole. We show how this metric can be used to describe several physical situations of particular interest, including a growing black-bounce, a wormhole to black-bounce transition, and the opposite black-bounce to wormhole transition.